On the subgroup regular set in Cayley graphs

Abstract

A subset C of the vertex set of a graph is said to be (a,b)-regular if C induces an a-regular subgraph and every vertex outside C is adjacent to exactly b vertices in C. In particular, if C is an (a,b)-regular set of some Cayley graph on a finite group G, then C is called an (a,b)-regular set of G and a (0,1)-regular set is called a perfect code of G. In [Wang, Xia and Zhou, Regular sets in Cayley graphs, J. Algebr. Comb., 2022] it is proved that if H is a normal subgroup of G, then H is a perfect code of G if and only if it is an (a,b)-regular set of G, for each 0≤ a≤|H|-1 and 0≤ b≤|H| with (2,|H|-1) a. In this paper, we generalize this result and show that a subgroup H of G is a perfect code of G if and only if it is an (a,b)-regular set of G, for each 0≤ a≤|H|-1 and 0≤ b≤|H| such that (2,|H|-1) divides a.